On the existence of small strictly Neumaier graphs

Abstract

A Neumaier graph is a non-complete edge-regular graph containing a regular clique. In this work, we prove several results on the existence of small strictly Neumaier graphs. In particular, we present a theoretical proof of the uniqueness of the smallest strictly Neumaier graph with parameters (16,9,4;2,4), we establish the existence of a strictly Neumaier graph with parameters (25,12,5;2,5), and we disprove the existence of strictly Neumaier graphs with parameters (25,16,9;3,5), (28,18,11;4,7), (33,24,17;6,9), (35,22,12;3,5) and (55,34,18;3,5). Our proofs use combinatorial techniques and a novel application of integer programming methods.